Ptolemy's intense or syntonous diatonic scale, or syntonic diatonic scale, is a tuning for the diatonic scale proposed by Ptolemy[1], declared by Zarlino to be the only tuning that could be reasonably sung, and corresponding with modern just intonation.[2]
It is produced through a tetrachord consisting of a greater tone (8/9), lesser tone (9/10), and diatonic semitone (15/16).[2] Thus Ptolemy's intense diatonic scale, Ptolemaic Sequence,[3] or the justly tuned diatonic major scale[4][5][6]:
Note | Name | C | D | E | F | G | A | B | C | ||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
Solfege | Do | Re | Mi | Fa | Sol | La | Ti | Do | |||||||||
Ratio | 1/1 | 9/8 | 5/4 | 4/3 | 3/2 | 5/3 | 15/8 | 2/1 | |||||||||
Harmonic | |||||||||||||||||
Cents | 0 | 204 | 386 | 498 | 702 | 884 | 1088 | 1200 | |||||||||
Step | Name | T | t | s | T | t | T | s | |||||||||
Ratio | 9/8 | 10/9 | 16/15 | 9/8 | 10/9 | 9/8 | 16/15 | ||||||||||
Cents | 204 | 182 | 112 | 204 | 182 | 204 | 112 |
In comparison to Pythagorean tuning, while both provide just perfect fourths and fifths, the Ptolemaic provides just thirds which are smoother and more easily tuned.[7]